Ch6. Energy Balance. A - eas.ualberta.ca · Chapter 6. Energy balance....
Transcript of Ch6. Energy Balance. A - eas.ualberta.ca · Chapter 6. Energy balance....
Chapter 6. Energy balance. EAS270_Ch6_EnergyBalance_A.odpJDW, EAS U.Alberta, last mod. 4 Oct. 2016
Energy in – Energy Out = Change in stored energy
or
Rate of energy addition – Rate of energy subtraction = Rate of change of stored energy
Fig 6.5
● numeric values in the radiative and energy "budgets" we cover today constitute climatological values (annual-global averages) and correspond to "steady state"
● we start with a gross planetary energy budget that assumes steady state – and reveals the strong stabilizing feedback that keeps earth's temperature in equilibrium with the sun
● we'll progress to short-term (say, 30 min) local surface energy budget
● gains "should" balance losses (we'll see why)
● satellite measurements show "until recently, they have come close to doing so" (Ross, p128)
Sec 6.1 Earth's radiative balance & effective radiating temperature 2/11
Net solar radiation = (1−α) x S0 x π rE2
Longwave emission = 4 π r E2 x σTE
4
Strong stabilizing feedback – if TE were to drop by 1%, longwave loss would drop by ??%?
Then TE would recover. It's in this sense that global gains & losses "should" (p128) balance
AS=4 π rE2
A I=π rE2
d TE
dt∝ (1−α) S0 π rE
2 − 4 π rE2 σTE
4 α planetary albedo (shortwave reflectivity)
Fig 6.1
TE
(A "bulk" model with an isothermal earth)
IN OUT
TE = [S0
4σ(1−α)]
1/4
● assuming steady state, so that
● α taken as 0.3 gives TE = -18oC (255 K)
● which is 33 K too cold relative to observed global mean annual sfc temp
● selective absorption & emission by GHG in atmos. raises surface temperature
AS=4 π rE2
A I=π rE2
Fig 6.1
Sec 6.1 Earth's radiative balance & effective radiating temperature 3/11
d TE
dt= 0
Sec 6.2 Energy balance – Flows of solar radiant energy 4/11
A I=π rE2
AS=4 π rE2
100 units represents S0
captured on area
distributed over area
giving S0/4 = 341 W m-2
for 100 units
(Compare Example 6.2)
30 to space
Fig 6.2
Not expected to remember these numbers
Sec 6.3 Energy balance – Flows of longwave (terrestrial) radiant energy 5/11
● recall 1 unit represents 3.41 W m-2 , how many units does earth's sfc emit? If we adopt a mean annual T
sfc = 15.9oC
and assume surface emisssivity is 1,
E=σ(273.15+15.9)4
= 395.8 W m−2=116.07 units
● surface receives less longwave than it emits because it is warmer than the atmosphere
● according to these numbers, the 70 units of longwave radiant energy lost to space exactly balance the 70 units of shortwave radiant energy retained by the planet
70 to space
Fig 6.3
Average longwave emission rate from earth's surface (per unit surface area)
Sec 6.4 Planetary Energy balance 6/11
● 1 unit represents 3.41 W m-2 ● therefore mean sensible heat flux density Q
H = 17 W m-2
● QE = 81.8 W m-2
QH
Fig 6.6
QE (= L
v E )
● net allwave radiative gain by surface: 47+98-116=29
● net allwave radiative gain by atmos: 23+104-156= - 29
● equilibration by non-radiative exchange (convection & conduction)
"Radiative surplus for earth's surface and a radiative deficit for the atmosphere"
Fig 6.6
Sec 6.4 Planetary Energy balance 7/11
QH
These fluxes carried by conduction/diffusion in laminar sublayer, handing over to convection above
QE (= L
v E )
● net loss from surface in longwave: 116-98=18● total losses from sfc: 5+24+18=47● planetary albedo (23+7)/100=0.3
● net gain by atmos: 23+5+24+104-156=0● net gain by planet: 100-23-7-12-58=0● 47 absorbed by surface includes
absorption within the upper ocean
Fig 6.6
QH
Sec 6.4 Planetary Energy balance 8/11
QE (= L
v E )
● the foregoing figures were rounded
● best satellite estimates for annual global averages:
341.3 W m-2 incident shortwave (100 units)
101.9 W m-2 reflected shortwave (29.86 units)
238.5 W m-2 longwave to space (69.87 units)
0.27 unit surplus (0.9 W m-2)
Earth system is warming as expected (feedback) – despite that, measurements indicate system is not quite in balance
Fig 6.5
Sec 6.4 Planetary Energy IMbalance (revealed by more exact numbers) 9/11
Sec 6.5 Latitudinal radiative imbalance (annual average basis) 10/11
● why is there no curve for incoming longwave radiation?● dip in L↑ in the equatorial region is due to prevalence of cloud cover
● at latitudes higher than about 40o, losses exceed gains● consequent temperature difference drives the general circulation of wind and oceans● atmosphere responsible for 3/4 and ocean 1/4 of the meridional heat transfer that annuls
the radiative imbalance
These estimates apply above the atmosphere● how do we know thermal advection by atmos. & ocean largely annuls the radiative imbalance?
Fig 6.8● because the equator
is not, year after year, getting hotter, nor are the poles getting colder – must be near steady state
L↑
K↓−K↑
K *=K↓−K↑
=K ↓−α K↓
=K ↓ (1−α)
Sec 6.5 Meridional heat transport by the atmos. & oceans 11/11
Advection by the meridional (i.e. north-south) wind component results in about 75% of the needed latitudinal heat transfer
poleequator
A stabilizing feedback prevails – an increase in the latitudinal temperature gradient strengthens the circulation of atmos. & ocean, thereby increasing north-south heat advection and smoothing out the latitudinal gradient
Fig 6.10
Fig 6.9Ocean currents (25% of the required adjustment) are driven by gradients in density (ocean density is controlled by temperature and salinity)
Topics/concepts covered
● radiative equilibrium temperature of an isothermal earth devoid of atmosphere
● global budget of solar and terrestrial radiative fluxes in earth-atmos. system
● gross global energy budget
● latitudinal trend in net radiation above the atmosphere
● resulting meridional heat transport
● when finished this material we'll move on to consider energy flows at local scale